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Notes and Solved Problems for Common Exam 2
3. GAUSS LAW
Key concepts: Gaussian Surface, Flux, Enclosed Charge
Gauss Law is equivalent to the Coulomb law but sometimes more
useful. Gauss law considers a flux of an electric field thru some
hypothetical surface (called a Gaussian surface) The flux of the
field E thru the surface S is formally an integral
EdS = rr
The Gauss law relates the flux of the electric field thru the
Gaussian surface with the total charge enclosed by this surface
0
totalqEdS
= =rr
The usefulness of the Gauss law is seen when calculating
electric fields near symmetrical objects. For these situations, the
electric field can for example be a constant on the surface of the
integration and can be taken out of the integral defined above. The
integral can then often be done easily (it is just the area of the
Gaussian surface) and one can immediately find and expression for
the electric field on the surface.
The units of electric flux: 2 /Nm C
Gausss Law helps us understand the behavior of electric fields
inside the conductors. Since the conductors are the objects where
the electrons move freely the electric field must be zero
everywhere inside the conductor. The reason: if a conducting object
is placed in a non-zero external electric field the charge inside
the conductor will move towards its surface until the electric
field created by this displaced charge completely compensates the
external electric field. The total electric field inside the
conductor is therefore zero. If that were not so, free charges
would move due to the field and make it so.
The Gauss law also helps us understand the distribution of
electric charge placed into a conductor. Since the electric field
inside every conductor is always zero, there cannot be extra
electric charge located inside of one. Therefore, any extra charge
placed into the conductor will move until it is distributed only on
the surface of the conductor. This can be proven by considering any
Gaussian surface lying completely inside the conductor, since
electric field inside the conductor is zero, there is no charge
which is enclosed inside this Gaussian surface.
Typical problems related to Gauss Law:
Problem 12. Find the flux through a spherical Gaussian surface
of radius a = 1 m surrounding a charge of 8.85 pC.
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A) 1 x 10-16N m2/C B) 1 x 10-12 N m2/C C) 1 x 10-8 N m2/C D) 1 x
10-4 N m2/C E) 1 N m2/C
Solution. The flux thru the Gaussian surface is the charge
located inside the surface. Therefore:
12 12 20/ 8.85*10 /8.85*10 1 /q Nm C = = =
Answer E
Problem 13. A positive charge Q= 8 mC is placed inside the
cavity of a neutral spherical conducting shell with an inner radius
a and an outer radius b. Find the charges induced at the inner and
outer surfaces of the shell.
A) Inner charge = 8 mC, Outer charge = +8 mC B) Inner charge =
+8 mC, Outer charge = -8 mC C) Inner charge = 0 mC, Outer charge =
+8 mC D) Inner charge = 8 mC, Outer charge = 0 mC E) Inner charge =
0 mC, Outer charge = 0 mC
Solution. Inside any conductor the electric field must equal
zero. Therefore, the electric field created by the external charge
inside the shell is cancelled by electric fields created by the
induced charged on the inner and outer surfaces of the shell.
Choosing the Gaussian surface to enclose the external charge and
the
inner surface of the shell and applying the Gauss law: 0 inEdS Q
q = = = + since the electric field inside the conductor is zero.
This gives us 8inq Q mC= = Since the conducting shell is
electrically neutral, the charge induced on the inner part of the
shell has been taken from the outer surface of the shell which
implies
0 8in out outq q q mC+ = => =
Answer A.
Problem 14. A positive charge Q=8 mC is placed inside a
spherical conducting shell with inner radius a and outer radius b
which has an extra charge of 4 mC placed somewhere on it. When all
motion of charges ends (after 10-15 sec), find the charges on the
inner and outer surfaces of the shell.
A) Inner charge = 8 mC, Outer charge = +8 mC B) Inner charge =
+8 mC, Outer charge = -8 mC C) Inner charge = +8 mC, Outer charge =
-12 mC D) Inner charge = 8 mC, Outer charge = 12 mC E) Inner charge
= -4 mC, Outer charge = +4 mC
Solution. Inside any conductor the electric field equals zero.
Therefore, the electric field created by the external charge inside
the shell is compensated by
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the electric fields created by the induced charges on the inner
and outer surfaces of the shell. Choosing the Gaussian surface to
enclose the external charge and
the inner surface of the shell and applying the Gauss law: 0
inEdS Q q = = = + since the electric field inside the conductor is
zero. This gives us 8inQ q mC= = The conducting shell here is not
electrically neutral, but has some extra charge 4 mC. Since net
charge has to remain constant (none of it can escape), the charge
on the outer surface of the shell equals the net charge plus a
charge equal in magnitude to that on the inner surface but of the
opposite sign. The condition is 4 12in out outq q mC q mC+ = =>
=
Answer D.
Problem 15. Find the value of the electric field at a distance
r= 10 cm from the center of a non conducting sphere of radius R= 1
cm which has an extra positive charge equal to 7 C uniformly
distributed within the volume of the sphere.
A) 6.3 x 1012 N/C B) 7.5 x 10-6 N/C C) 1.2 x 100 N/C D) 9.1 x
10-3 N/C E) 8.5 x 102 N/C
Solution. If the charge at the sphere is distributed uniformly,
for r>R the electric field created by it is the same as the
electric field of the same amount of point charge located at the
center of the sphere (Shell Theorem)..
9 122 2 2
78.99*10 6.3*10 /(10*10 )qE k N Cr
= = =
Answer A.
Problem 16. A positive charge is placed inside a spherical
metallic shell with inner radius a and outer radius b. The charge
is placed at shifted position relative to the center of the shell.
Describe the charge distribution induced at the shell surfaces.
A) A negative charge with uniform surface density will be
induced on the inner surface, a positive charge will be induced on
the outer surface. B) A negative charge with non-uniform surface
density will be induced on the inner surface, a positive charge
will be induced on the outer surface. C) A positive charge with
uniform surface density will be induced on the inner surface, a
negative charge will be induced on the outer surface. D) A positive
charge with non-uniform surface density will be induced on the
inner surface, a negative charge will be induced at the outer
surface.
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E) A negative charge with uniform surface density will be
induced on the inner surface, a positive charge will be induced on
the outer surface.
Solution. First, since the external charge placed inside has a
positive sign, the inner surface will be charged negatively, and
the outer surface will be charged positively. There is no charge
induced in the bulk of the metallic shell. Second since the
external charge is not precisely at the center of the shell, the
induced charge density on the inner surface will not be
uniform.
Answer B.
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4. ELECTRIC POTENTIAL
Key concepts:
Just as we visualize charged objects creating an electric field
around them, they also create a potential field. The potential
field or equivalently electric potential is directly related to the
electric field:
( ) ( )
( )
V x E x dx
dVE xdx
=
=
Therefore the electric field can be represented either by
specifying the electric field itself as a function of r, or by
specifying the electric potential at each point r.
In some problems the concept of electric potential may be more
useful than the concept of electric field since the potential is a
scalar function (scalar defined for each point of the space) while
the electric field is a vector function (vector defined for each
point of the space)
For example, the electric potential of a point charge located at
the origin (r=0) as a function of r is given by
( ) qV r kr
=
It is easy to see that the derivative of this function with
respect to r and multiplied by 1 gives the electric field of the
point charge
2( )qE r kr
=
Note that the potential is defined with respect to some
arbitrary constant since adding a constant to the potential does
not influence its derivative with respect to r. We can for example
write 0( )
qV r k Vr
= + which will produce the same electric
field. Usually the constant is chosen in such a way that the
electric potential is equal zero when r goes to infinity. For the
point charge this will produce 0 0V = in the example above.
Another important example is the potential created by an
infinite charged plate. The electric field created by the plate
having surface density is given by
0/ 2E = , i.e. it remains constant and does not depend on the
distance. The electric potential of this plate is an integral with
respect to x, and therefore:
( ) .V x Ex const= + where x is the distance from the plate to
the point where we measure the potential. Note that the potential
increases as x goes to infinity, therefore in this example it is
not possible to fix const. to a value that makes the potential at
infinity equal to zero. However if we are interested in the
potential difference between two points, say x1 and x2, the
constant will drop out:
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1 2 1 2 1 20
( ) ( ) ( ) ( )2
V x V x E x x x x
= =
The potential can be visualized by drawing so called
equipotential surfaces (surfaces of the same potential). For
example, for the point charge, these surfaces are the spheres
centered at r =0 since at all points of the surface, r is the same,
therefore ( ) qV r k
r= is the same, which produces an equipotential
surface. For the potential created by the infinite plate, the
equipotential surfaces are the planes parallel to the charged plate
since the potential is
( ) .V x Ex const= + and all points separated by the distance x
from the plate form a plane surface.
Note that the equipotential surfaces are always perpendicular to
the electric field lines. For example, the electric field lines for
a point charge are lines originating radially from the origin,
while equipotential surfaces are spheres centered at the origin.
For an infinite charged plate, the electric field lines are the
lines perpendicular to the plate while equipotential surfaces are
the planes parallel to the plate.
Note also that it costs zero energy to transfer charge between
any two points on an equipotential surface: Since the work done by
the electric field described by the potential V(r) to move the
charge Q from the point r1 to the point r2 is given by:
1 2*[ ( ) ( )]W Q V r V r= , this work is always equal zero as
long as 1 2( ) ( )V r V r= which is the formal definition of an
equipotential surface.
A comment about the test charge placed into the electric
potential: we learned that a positive charge placed into the
electric field would move along the field direction while a
negative charge placed into the electric field would move in the
direction opposite to the field direction. If we follow the field
direction, the potential decreases. This simply follows from the
fact that ( ) dVE x
dx= , or, in
other words, if the potential decreases, its derivative is
negative, and taking the minus sign into account produces a
positive E(x).
Therefore, the positively charged particle will always move from
the region of the higher potential to the region of the lower
potential. Likewise, a ball placed on top of a hill will move down
the hill since the potential energy of the ball on top of the hill
is larger than its potential energy lower down, and the ball wants
to minimize its potential energy. (Here we should recall the
relationship for the gravitational potential ( )V h mgh= , where m
is the mass of the ball, g is free fall acceleration and h is the
height.)
For negatively charged particles the situation is reversed:
negatively charged particles would always move from the region of
the lower potential to the region of the higher potential, although
they are still moving spontaneously from higher
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to lower potential energy. The example of the ball does not
represent this: a ball placed near the bottom of a hill will not
spontaneously move upward. This does not happen of course since
there is no such thing as negative masses in mechanics.
Typical problems related to electric potential:
Problem 1. Calculate the difference between the potential at r =
5 cm and r = 10 cm for a single point charge of 1 C located at the
origin.
A. 9*10-10 V B. 9*10-5 V C. 9*100 V D. 9*10+5 V E. 9*10+10 V
Solution. The potential created by a single point charge is
given by ( ) qV r kr
= .
Therefore 9 2 2 10
1 2 1 2( ) ( ) (1/ 1/ ) 9*10 *1*(1/(5*10 ) 1/(10*10 )) 9*10V r V
r kq r r V = = =
Answer E.
Problem 2. What are the equipotential surfaces of the uniformly
charged sphere?
A. Equipotential surfaces are the planes crossing the sphere and
perpendicular to z axis
B. Equipotential surfaces are the cylinders with the common axis
along z direction
C. Equipotential surfaces are the spheres centered at the center
of the charged sphere
D. Equipotential surfaces are elliptical and stretched along z
direction. E. Insufficient information.
Solution. For the uniformly charged sphere the electric
potential at r larger than the sphere radius is the same as for the
point charge concentrated at the center of the sphere. This is the
same as for the electric field created by the uniformly charged
sphere, which can be found as from the same point charge placed at
the sphere center. Therefore the equipotential surfaces are spheres
centered at the origin.
Answer C.
Problem 3. Find the electric potential at the center of the
equilateral triangle whose side is 1m if there are three positive
charges of 1 C, 2 C and 3 C in its corners. (Assume that V(r)=0
when r goes to infinity)
A. 9.07*10-10 V
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B. 3.21*10-5 V C. 7.09*100 V D. 9.23*10+10 V E. 2.31*10+14 V
Solution. The electric potential at the center of the triangle
is the sum of the electric potential from each charge: 1 2 3( ) ( )
( )V V r V r V r= + + where r is the distance between the charge
and the center of the triangle which is the same for all three
charges (as long as the triangle is equilateral). If the side is 1
m, the distance to the center is 0.5/cos(30)=1/ 3 . We finally
have
9 101 2 3/ / / 9*10 * 3 *(1 2 3) 9.23*10V kq r kq r kq r V= + +
= + + =
Answer D.
Problem 4. If the potential has a form of stairs at which points
the electric field is the largest?
A. At the bottom of the stairs. B. At the top of the stairs C.
At flat area of each step of the stairs D. At transition points
between the steps E. The electric field is constant across the
stairs.
Solution. The electric field is the derivative of the potential
with respect to x. Therefore the electric field is the largest at
the points where the derivative of the potential with respect to x
is largest. If the potential has a step like form, its derivative
is zero at all flat areas of the steps while the derivative goes to
infinity at transition points between each step (since the
derivative is simply given by the slope, i.e. tan(0)=infinty).
Therefore electric field is infinite at transition points and zero
everywhere else.
Answer D.
Problem 5. Find the value of the surface charge density for the
infinitely charged plate if it is known that each two equpotential
surfaces separated by 1 m have potential difference of 5 V.
A. 8.85*10-11 V B. 8.85*10-9 V C. 8.85*10-7 V D. 8.85*10-5 V E.
8.85*10-3 V
Solution. For infinitely charged plate, the electric field is
constant and it is given by
02E
= . The potential corresponding to the constant field is given
by:
( ) .V x Ex const= + The equipotential surfaces between any two
points x1 and x2
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have the potential difference: 1 2 1 2( ) ( ) ( )V x V x E x x =
. From here we conclude that the absolute value of the electric
field
1 2 1 2( ( ) ( )) /( ) 5/1 5 / 5 /E V x V x x x V m N C= = = =
It follows that 12 11 202 2 *5*8.85*10 8.85*10 /E C m = = =
Answer A.
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5. CAPACITANCE
Key concepts:
A typical capacitor consists of metallic plates separated by
some distance.
If a capacitor is charged (the plates have charge +Q and Q), it
maintains a potential difference between the plates.
If the plates have a charge +Q and Q, the charge is related to
the potential difference between the plates by
Q=C*V
where C is called the capacitance of the capacitor. If a battery
with potential difference V is attached to capacitor, the charge
after a long time will be Q=C*V
Units of C are Farads: 1 F= 1 Coulomb/1 Volt. Frequently used
units also are F=10-6 F and pF = 10-12 F.
Formulas for capacitances:
Parallel plate capacitor: C= 0* A /d, where A is an area of the
plate, and d is the distance between the plates.
Spherical capacitor: C=4pi0R, where R is the radius of the
sphere.
If a capacitor is filled with a dielectric material, its
capacitance is increased by times where is the dielectric constant
of the material. The dielectric constant is always > 1. In other
words, if you know the capacitance of the vacuum capacitor (no
dielectric between the plates), the capacitance of the capacitor
with the dielectric is diel airC C=
If capacitors are connected in parallel, the sum of capacitances
gives the equivalent capacitance: Ceq = C1 + C2 + C3+
If capacitors are connected in series, the sum of reciprocal
capacitances gives the reciprocal (!!!) equivalent capacitance
C-1eq =C-11 + C-12 + C-13+
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Typical problems involving capacitors:
Problem 6. Find the capacitance of a parallel plate capacitor
with plates of area 1 cm2 , if the distance between them is equal
to 1 mm and it is filled with a dielectric solid having dielectric
constant =10.
A. 885 F B. 8.85 kF C. 8.85 pF D. 885 mF E. 885 F
Solution. C= 0* A /d =8.85*10-12 *10*(0.000 1)
/0.001=8.85*10-10F=885 pF. Answer C
Problem 7. What is the charge that appears on the plates of the
10 pF capacitor if it is connected to a battery of 9 V:
A. 90 pC B. 90 mC C. 90 kC D. 90 C E. 90 C
Solution. Q=C*V=10*10-12*9=90*10-12C=90 pC. Answer A.
Problem 8. What is the voltage that should be applied to the 5 F
capacitor to accumulate 1C charge on its plates?
A. 0.2 V B. 0.2 mV C. 0.2 kV D. 0.2 nV E. 0.2 V
Solution. V=Q/C=10-6/(5*10-6)=0.2 V Answer A.
Problem 9. Find the value of the electric field between the
plates of the parallel-plate capacitor if the voltage is 120 V and
the distance between the plates is 1 mm.
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A. 120 kN/C B. 120 N/C C. 120 mN/C D. 120 nN/C F. 120 N/C
Solution. E=V/d = 120/(1*10-3) = 120000 N/C = 120 kN/C Answer
A.
Problem 10. Find the equivalent capacitance for the following
circuit if C1=1 pF, C2=0.5pF, C3=1pF
A. 1 pF B. 1/2 pF C. 1/3 pF D. 1/4 pF E. 1/5 pF
Solution.
Two capacitors C2 are in parallel, therefore equivalent
capacitance is 0.5+0.5=1 pF. Now all capacitors are in serial,
therefore the sum of reciprocal values is 1/1+1/1+1/1=3. The
reciprocal of 3 is 1/3 pF which the answer.
Answer C.
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Problem 11. Find the value of the electric field exactly in the
middle between the plates of a cylindrical capacitor if its inner
radius 1 mm, its outer radius is 2 mm, its height is 1 cm, and its
charge is 1 mC.
A. 0.5*10-4 N/C B. 6.2*10-21 N/C C. 1.2*10+12 N/C D. 0.1*10-8
N/C E. 7.9*10+3 N/C
Solution. First recall the expression for the electric field
created by a single charged cylinder of length h at the distance r
(larger than the radius of the cylinder). Applying the Gauss
theorem for the surface surrounding the charged cylinder gives:
0
( )2
qE rrhpi
=
For a cylindrical capacitor, there are inner and outer
cylinders; the electric field between the cylinders is created only
by the inner cylinder since for the outer cylinder r is less than
its radius and application of the Gauss theorem produces zero
electric field (choosing any cylindrical Gaussian surface with the
radius less than the radius of the charged cylinder will not
enclose any charge). Therefore, the electric field behaves as a
function of r for the cylindrical capacitor as follows
0
( ) ,2 in out
qE r r r rrhpi
= < <
Finally, the electric field has to be evaluated at the middle
point, i.e. at ( ) / 2in outr r r= +
And it is given by 3
123 2 12
0
10( ) 1.2 *10 /2 2*3.14*1.5*10 *10 *8.85*10mid
qE r N Cr hpi
= = =
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6. CURRENT AND RESISTANCE
Key concepts:
Electric current is the amount of charge passed through the
conductor per unit time:
i=dQ/dt, or dQ = idt
For a constant (in time) charge flow: i=Q/t, therefore the total
charge passed through the conductor for a time interval t can be
found: Q=i*t.
The direction of the current is assumed to be the direction of
the positive charge flow.
Units of current: Ampere. 1 A= 1 C / 1 s
Concept of the current density: if the current flows thru a
cross-sectional area A of the wire, the current density J (current
per unit area) is defined as the ratio
/J i A= If the constant current i flows thru the wire of
different cross-sections 1 2 3...A A A , the current itself remains
constant for any cross section, but the current density for
different cross-sections will be different: 1 1 2 2 3 3 ...i J A J
A J A= = = =
Electrons travel thru the wire with some velocity. Since the
electrons are continuously accelerated by the electric field
created by the battery, and slow down due imperfectness of the
lattice (impurities, vacancies, lattice vibrations, etc), the
electrons velocity remains constant on the average and it is called
drift velocity. The drift velocity dv is connected to the current
density J as follows:
dJ nev= where n is the number of electrons per unit volume
(electrons density), e is the charge of single electron, which is
1.6*10-19 C. Typical drift velocities of the electrons are very
small (of the order 6 810 10 /m s )
If the potential difference is applied across a piece of wire, a
current exists in the wire. The current i is related to the applied
potential difference V via: i=V/R which is known to be Ohms law.
The coefficient R is called resistance and is directly related to
the fact that the lattice resists to electrons flow via its
imperfectness. Units of R are Ohms. (): 1 = 1V/1A.
The resistance of the wire depends on its length L and the
cross-sectional area A and the characteristics of the material
itself which is called resistivity . The relationship between the
resistance R and the resistivity for the wire is: R= *L/A
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Power (energy spent/gained per unit time) consumed in the
circuit is the product of the current times the voltage: *P i V=
Assuming that the current is connected to the voltage via the Ohm
law: /i V R= , The following formulae are also valid: 2 2 /P i R V
R= =
Typical problems related to current and resistance:
Problem 12. A current of 5 A exists in the wire for 3 min. What
is the total charge passed through any cross-sectional area of the
wire?
A. 0.9 kC B. 0.9 C C. 0.9 mC D. 0.9 nC E. 0.9 C
Solution. Q=i*t=5*3*60=900 C = 0.9 kC. Answer A.
Problem 13. A metallic wire has resistivity 10 *cm, length L
equal to 50 cm and the diameter d equal to 2 mm. What is its
resistance?
A. 16 m B. 16 C. 16 k D. 16 n E. 16
Solution. R=*L/A =*L/(piR2)=4*L/(pid2)=
4*10*10-6*10-2*0.5/(3.14*4*10-6)=0.016 = 16 m Answer A.
Problem 14. If a piece of wire is stretched by n times what
happens to the resistance?
A. Increases as n B. Increases as n*n C. Decreases as n D.
Decreases as n*n E. Does not change
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Solution. Assume that the resistivity, density and consequently
the volume do not change during the stretching process. Then, if
the wire in the old state has the length Lold and the
cross-sectional area Aold while the wire in the new stretched state
has the length Lnew and the cross-sectional area Anew, the old
volume Lold *Aold is equal to the new volume Lnew *Anew.
It is therefore, Anew/ Aold = Lold /Lnew
New resistance Rnew=* Lnew /Anew=* Lnew/Aold *Lnew /Lold = *
Lold/Aold*(Lnew /Lold) 2= Rold *( Lnew /Lold) 2
Therefore, new resitance Rnew= Rold*n2 since we assume that Lnew
/Lold =n
Answer B.
Problem 15. What is the drift velocity of the electrons for the
current of 1.6 A passing thru the wire which has a cross-sectional
area of 1 mm2. (Assume that typical density of the electrons is
1030 el/m3)
A. 10-15 m/s B. 10-10 m/s C. 10-5 m/s D. 10+5 m/s E. 10+15
m/s
Solution. A drift velocity is connected to the current density
as follows dJ nev= . For the current itself, this relationship
reads as follows: di nev A= ,where
A is the cross-section of the wire. Evaluating the drift
velocity gives 5
30 19 61.6 10 /
10 *1.6*10 *10di
v m sneA
= = =
Problem 16. How much money you will spend per day for having a
bulb working in the house circuit with the voltage of 110V and the
current of 1 A . (Assume that 1 kW*hour costs 10 cents)
A. 0 $ B. 0.26 $ C. 2.6 $ D. 26.0 $ E. 260.0 $
Solution. Lets calculate the power consumed by our bulb: * 1*110
110P i V Watt= = = ,
The energy, which will be required to keep the bulb lighting for
a whole day (24 hours=24*3600 s) is given by: 6* 110*24*3600
9.5*10E P t Joules= = = . Alternatively, since we know the price in
kW*hour, we can calculate the energy in
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more appropriate units: 0.11( ) *24( ) 2.64 *E kW hours kW hour=
= . If 1 kW*hour costs 10 cents, 2.64 kW*hour will cost 26
cents.
Answer B.
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7. SINGLE LOOP CIRCUITS
Key concepts:
A Battery is a device that maintains a potential difference
between its two poles. The poles are denoted - and +. The potential
at the - pole is smaller than the potential at the + pole.
The important characteristic of the battery is its electromotive
force (EMF) denoted as E . If the battery is ideal, the potential
difference V that is maintains is equal to E . For real batteries,
there is an internal resistance usually denoted "r" that acts in
series with the battery.
The simplest circuit consists of a battery and resistor in a
single loop circuit:
The current within the circuit flows from the region of higher
potential to the region of lower potential (see picture above),
i.e. from Vb to Va.
Due to chemical reactions, the current inside the battery flows
from - to +, i.e from the region of lower potential (Va) to the
region of the higher potential (Vb). The electromotive force is
directed from - to + i.e. it pushes
the positive charge inside the battery in the direction of lower
potential to the direction of higher potential.
Real batteries have some internal resistance, therefore the
potential difference they maintain is different from E: V=E-i*r,
where r is the internal resistance of the battery and i is the
current through the battery.
Real batteries can be represented by two pieces: the ideal
battery which maintains V=E and the resistor r. The potential
difference V that is available is less than the EMF by i*r, where i
is the current through the battery.
If resistors are connected in serial, the sum of resistances
gives the equivalent resistance:
Req = R1 + R2 + R3+
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If resistors are connected in parallel the sum of reciprocal
resistances gives the reciprocal equivalent resistance:
R-1eq = R-11 + R-12 + R-13+
These relations are reversed from those describing capacitors in
series and parallel.
The current through a single loop circuit is the same everywhere
and can be found by applying the Kirchoff loop rule:
The sum of all potential differences in a complete loop through
the circuit should be equal zero.
The power P is the energy (spent or gained) per unit time. In
the problems related to the circuits the energy can be supplied by
the batteries, the energy can dissipate in resistors and bulbs,
etc. Power P can be found as a product of the current times
voltage. For example the energy rate (power) dissipated in the
resistor is the product of the current inside the resistor times
the voltage across the resistor: P=i*V =i2*R=V2/R, where we have
used the relationship i=V/R.
For ideal batteries, the battery supplies the power to the
circuit P=i*E.
Typical problems related to single loop circuits:
Problem 1. A circuit consists of the real battery (E=10V, r= 2 )
and the resistor R= 3. Calculate current and the total power
released in the circuit.
A. 1 A, 10 W B. 0.5 A, 5 W C. 2 A, 20 W D. 3 A, 15 W E. 5 A, 3
W
Solution. First, walk through the loop and write the Kirchoff
equation. This will give us the equation for the current. Since the
battery arrow (from - to +) is pointed up, and there is only one
battery, the direction of the current is clockwise. Walking
clockwise:
E-i*r-i*R=0
i=E/(r+R)=2A.
-
Now, the total power released in the circuit is the sum of the
power lost in the resistor r and R. Since the current is known, the
useful formula for power P=i*V= i2*R. Power released in r: Pr=
i2*r=2*2*2=8 W Power released in R: PR= i2*R=2*2*3=12 W
The total power released in the circuit is therefore
12+8=20W.
Note that the same answer can be found quicker: this is the
power which ideal piece of the battery supplies to the circuit:
P=i*E=2*10=20 V Answer C.
Problem 2. A circuit consists of the ideal battery (E=18 V) and
two kinds of resistors R1=3, R2=2. Calculate current through the
battery and the total power released in the circuit.
A. 3 A, 64W B. 6 A, 108 W C. 12 A, 216 W D. 1 A, 32 W E. 0.5 A,
108 W
Solution. While formally it is a multi loop circuit, the problem
is simple since we need to find the current through the battery.
Therefore, first, we simplify the circuit by calculating equivalent
resistance. We have first three resistors in parallel, its
resistance is 1/(1/3+1/3+1/3)=1. Second, two resistors are in
parallel, therefore the equivalent resistance is 1(1/2+1/2)=1. The
third three resistors are in parallel, their resistance is
1/(1/3+1/3+1/3)=1. After, we have three serial connections with the
total resistance 1+1+1=3.
The second step is to find the current through the battery since
we have a simple single loop circuit with the battery and one
equivalent resistor of 3.
E-i*Req=0
i=E/Req=18/3=6 A.
The total power released in the circuit is the sum of all powers
released in all resistors. This is the same as the power which
battery supplies to the circuit. Therefore P=i*V=6*18=108 W Answer
B.
-
Problem 3. A fragment of the circuit is shown on the Figure.
What is the potential difference between the points B and A?
A. 1 V B. 2 V C. 5 V D. 4 V E. 3 V
Solution. It is easy to walk in the direction of the current
from the point A to the point B. Writing the Kirchoff equation:
VA+E1-R1*i-E2-R2*i+E3=VB E1-R1*i-E2-R2*i+E3=VB
-VA=2-2*3-1-3*3+15=1 V Answer A.
Problem 4. A bulb is connected to the battery of some EMF equal
to E. Will the bulb be brighter or dimmer if it will be reconnected
to a new battery of Enew=2E. By how much?
A. Twice brighter B. Twice dimmer C. The same D. Four times
brighter E. Four times dimmer
Solution. The brightness of the bulb is proportional to its
power. Therefore we have to figure out what happens to the power
released in the bulb if we change the voltage across it. If the
bulb has some resistance R, and it is connected to some ideal
battery E, its power P=i*V=i*E since the voltage across the bulb is
equal to the EMF of the battery. The current in the circuit i=E/R.
Therefore we can express the power of the bulb via E and R as
follows: P=i*V=i*E=E*E/R=E2/R.
This formula tells us if we increase the applied voltage by 2,
the power released in the bulb will increase quadratically, i.e. by
4.
Pnew=E2new/R=(2*E)2/R=4Pold
Answer D.
